#= init_data プログラム用 NAMELIST ファイル T170L100 用) # #= NAMELIST file for "init_data" (for T170L100) # # Copyright (C) GFD Dennou Club, 2008-2009. All rights reserved. # # Note that Japanese and English are described in parallel. # &adv_test_nml VelDist = "SymHadley" HCNumCell = 3, Omega0 = 0.0d0 / &restart_file_io_nml OutputFile = 'init_T170L100.nc', ! 初期値データのファイル名 ! filename of initial data / &fileset_nml FileTitle = 'Initial data for dcpam5', ! 出力データファイルの表題. ! Title of output data files FileSource = 'dcpam5 $Name: $ (http://www.gfd-dennou.org/library/dcpam)', ! データファイル作成の手段. ! Source of data file FileInstitution = 'GFD Dennou Club (http://www.gfd-dennou.org)' ! データファイルを最終的に変更した組織/個人. ! Institution or person that changes data files for the last time / &gridset_nml nmax = 170, ! 最大全波数. ! Maximum truncated wavenumber imax = 1, ! 経度格子点数. ! imax = 512, ! 経度格子点数. ! Number of grid points in longitude jmax = 256, ! 緯度格子点数. ! Number of grid points in latitude kmax = 100 ! 鉛直層数. ! kmax = 60 ! 鉛直層数. ! kmax = 30 ! 鉛直層数. ! kmax = 22 ! 鉛直層数. ! Number of vertical level / &composition_nml ncmax = 3, Names = 'QH2OVap', 'QTracer', 'QTracerNoMF', FlagAdv = .true. , .true. , .true., FlagMassFix = .true. , .true. , .false., FlagVDiff = .false. , .false. , .false. / ×et_nml RestartTimeValue = 0.0, ! リスタート開始時刻. ! Restart time of calculation RestartTimeUnit = 'day', ! リスタート開始時刻の単位. ! Unit of restart time of calculation !!$ Date = 2008, 10, 1, 12, 0, 0, 09, 00, !!$ ! 計算開始日時. (年月日時分秒, タイムゾーン時分) !!$ ! Start date of calculation. !!$ ! (year, month, day, hour, minute, second, !!$ ! and hour, minute of time zone) !!$ Calendar = 'gregorian', !!$ Calendar = 'julian', !!$ Calendar = 'noleap', !!$ Calendar = 'cyclic', !!$ ! 暦法. Calender / &axesset_nml ! L100 Sigma = 1.0000000000000000 0.98999999999999999 0.97999999999999998 0.96999999999999997 0.95999999999999996 0.94999999999999996 0.93999999999999995 0.92999999999999994 0.92000000000000004 0.91000000000000003 0.90000000000000002 0.89000000000000001 0.88000000000000000 0.87000000000000000 0.85999999999999999 0.84999999999999998 0.83999999999999997 0.82999999999999996 0.82000000000000006 0.81000000000000005 0.80000000000000004 0.79000000000000004 0.78000000000000003 0.77000000000000002 0.76000000000000001 0.75000000000000000 0.73999999999999999 0.72999999999999998 0.71999999999999997 0.70999999999999996 0.69999999999999996 0.68999999999999995 0.67999999999999994 0.66999999999999993 0.65999999999999992 0.64999999999999991 0.64000000000000001 0.63000000000000000 0.62000000000000000 0.60999999999999999 0.59999999999999998 0.58999999999999997 0.58000000000000007 0.57000000000000006 0.56000000000000005 0.55000000000000004 0.54000000000000004 0.53000000000000003 0.52000000000000002 0.51000000000000001 0.50000000000000000 0.48999999999999999 0.47999999999999998 0.46999999999999997 0.45999999999999996 0.44999999999999996 0.43999999999999995 0.42999999999999994 0.42000000000000004 0.41000000000000003 0.40000000000000002 0.39000000000000001 0.38000000000000000 0.37000000000000000 0.35999999999999999 0.34999999999999998 0.33999999999999997 0.32999999999999996 0.31999999999999995 0.30999999999999994 0.29999999999999993 0.29000000000000004 0.28000000000000003 0.27000000000000002 0.26000000000000001 0.25000000000000000 0.23999999999999999 0.22999999999999998 0.21999999999999997 0.20999999999999996 0.19999999999999996 0.18999999999999995 0.17999999999999994 0.16999999999999993 0.16000000000000003 0.15000000000000002 0.14000000000000001 0.13000000000000000 0.12000000000000000 0.10999999999999999 9.9999999999999978E-002 8.9999999999999969E-002 7.9999999999999960E-002 6.9999999999999951E-002 5.9999999999999942E-002 4.9999999999999933E-002 4.0000000000000036E-002 3.0000000000000027E-002 2.0000000000000018E-002 1.0000000000000009E-002 0.0000000000000000 ! L200 ! Sigma = 1.0000000000000000 0.99500000000000000 0.98999999999999999 0.98499999999999999 0.97999999999999998 0.97499999999999998 0.96999999999999997 0.96499999999999997 0.95999999999999996 0.95499999999999996 0.94999999999999996 0.94499999999999995 0.93999999999999995 0.93500000000000005 0.92999999999999994 0.92500000000000004 0.92000000000000004 0.91500000000000004 0.91000000000000003 0.90500000000000003 0.90000000000000002 0.89500000000000002 0.89000000000000001 0.88500000000000001 0.88000000000000000 0.87500000000000000 0.87000000000000000 0.86499999999999999 0.85999999999999999 0.85499999999999998 0.84999999999999998 0.84499999999999997 0.83999999999999997 0.83499999999999996 0.82999999999999996 0.82499999999999996 0.82000000000000006 0.81499999999999995 0.81000000000000005 0.80499999999999994 0.80000000000000004 0.79499999999999993 0.79000000000000004 0.78500000000000003 0.78000000000000003 0.77500000000000002 0.77000000000000002 0.76500000000000001 0.76000000000000001 0.75500000000000000 0.75000000000000000 0.74500000000000000 0.73999999999999999 0.73499999999999999 0.72999999999999998 0.72499999999999998 0.71999999999999997 0.71499999999999997 0.70999999999999996 0.70500000000000007 0.69999999999999996 0.69500000000000006 0.68999999999999995 0.68500000000000005 0.67999999999999994 0.67500000000000004 0.66999999999999993 0.66500000000000004 0.65999999999999992 0.65500000000000003 0.64999999999999991 0.64500000000000002 0.64000000000000001 0.63500000000000001 0.63000000000000000 0.62500000000000000 0.62000000000000000 0.61499999999999999 0.60999999999999999 0.60499999999999998 0.59999999999999998 0.59499999999999997 0.58999999999999997 0.58499999999999996 0.58000000000000007 0.57499999999999996 0.57000000000000006 0.56499999999999995 0.56000000000000005 0.55499999999999994 0.55000000000000004 0.54499999999999993 0.54000000000000004 0.53499999999999992 0.53000000000000003 0.52499999999999991 0.52000000000000002 0.51500000000000001 0.51000000000000001 0.50500000000000000 0.50000000000000000 0.49500000000000000 0.48999999999999999 0.48499999999999999 0.47999999999999998 0.47499999999999998 0.46999999999999997 0.46499999999999997 0.45999999999999996 0.45499999999999996 0.44999999999999996 0.44499999999999995 0.43999999999999995 0.43499999999999994 0.42999999999999994 0.42499999999999993 0.42000000000000004 0.41500000000000004 0.41000000000000003 0.40500000000000003 0.40000000000000002 0.39500000000000002 0.39000000000000001 0.38500000000000001 0.38000000000000000 0.37500000000000000 0.37000000000000000 0.36499999999999999 0.35999999999999999 0.35499999999999998 0.34999999999999998 0.34499999999999997 0.33999999999999997 0.33499999999999996 0.32999999999999996 0.32499999999999996 0.31999999999999995 0.31499999999999995 0.30999999999999994 0.30499999999999994 0.29999999999999993 0.29500000000000004 0.29000000000000004 0.28500000000000003 0.28000000000000003 0.27500000000000002 0.27000000000000002 0.26500000000000001 0.26000000000000001 0.25500000000000000 0.25000000000000000 0.24500000000000000 0.23999999999999999 0.23499999999999999 0.22999999999999998 0.22499999999999998 0.21999999999999997 0.21499999999999997 0.20999999999999996 0.20499999999999996 0.19999999999999996 0.19499999999999995 0.18999999999999995 0.18499999999999994 0.17999999999999994 0.17499999999999993 0.16999999999999993 0.16500000000000004 0.16000000000000003 0.15500000000000003 0.15000000000000002 0.14500000000000002 0.14000000000000001 0.13500000000000001 0.13000000000000000 0.12500000000000000 0.12000000000000000 0.11499999999999999 0.10999999999999999 0.10499999999999998 9.9999999999999978E-002 9.4999999999999973E-002 8.9999999999999969E-002 8.4999999999999964E-002 7.9999999999999960E-002 7.4999999999999956E-002 6.9999999999999951E-002 6.4999999999999947E-002 5.9999999999999942E-002 5.4999999999999938E-002 4.9999999999999933E-002 4.4999999999999929E-002 4.0000000000000036E-002 3.5000000000000031E-002 3.0000000000000027E-002 2.5000000000000022E-002 2.0000000000000018E-002 1.5000000000000013E-002 1.0000000000000009E-002 5.0000000000000044E-003 0.0000000000000000 ! $ \sigma $ レベル (半整数). ! Half $ \sigma $ level / &initial_data_nml pattern = 'advection test' ! 初期値データのパターン. ! Initial data pattern /